Jacobian variety

In mathematics, the Jacobian variety J(C) of a non-singular algebraic curve C of genus g is the moduli space of degree 0 line bundles. It is the connected component of the identity in the Picard group of C, hence an abelian variety.

Introduction

The Jacobian variety is named after Carl Gustav Jacobi, who proved the complete version Abel-Jacobi theorem, making the injectivity statement of Niels Abel into an isomorphism. It is a principally polarized abelian variety, of dimension g, and hence, over the complex numbers, it is a complex torus. If p is a point of C, then the curve C can be mapped to a subvariety of J with the given point p mapping to the identity of J, and C generates J as a group.

Construction for complex curves

Over the complex numbers, the Jacobian variety can be realized as the quotient space V/L, where V is the dual of the vector space of all global holomorphic differentials on C and L is the lattice of all elements of V of the form

${\displaystyle [\gamma ]:\ \omega \mapsto \int _{\gamma }\omega }$

where γ is a closed path in C. In other words,

${\displaystyle J(C)=H^{0}(\Omega _{C}^{1})^{*}/H_{1}(C),}$

with ${\displaystyle H_{1}(C)}$ embedded in ${\displaystyle H^{0}(\Omega _{C}^{1})^{*}}$ via above map.

The Jacobian of a curve over an arbitrary field was constructed by Weil (1948) as part of his proof of the Riemann hypothesis for curves over a finite field.

The Abel-Jacobi theorem states that the torus thus built is a variety, the classical Jacobian of a curve, that indeed parametrizes the degree 0 line bundles, that is, it can be identified with its Picard variety of degree 0 divisors modulo linear equivalence.

Algebraic structure

As a group, the Jacobian variety of a curve is isomorphic to the quotient of the group of divisors of degree zero by the subgroup of principal divisors, i.e., divisors of rational functions. This holds for fields that are not algebraically closed, provided one considers divisors and functions defined over that field.

Further notions

Torelli's theorem states that a complex curve is determined by its Jacobian (with its polarization).

The Schottky problem asks which principally polarized abelian varieties are the Jacobians of curves.

The Picard variety, the Albanese variety, and intermediate Jacobians are generalizations of the Jacobian for higher-dimensional varieties. For varieties of higher dimension the construction of the Jacobian variety as a quotient of the space of holomorphic 1-forms generalizes to give the Albanese variety, but in general this need not be isomorphic to the Picard variety.

References

• P. Griffiths; J. Harris (1994), Principles of Algebraic Geometry, Wiley Classics Library, Wiley Interscience, pp. 333–363, ISBN 0-471-05059-8
• J.S. Milne (1986), "Jacobian Varieties", Arithmetic Geometry, New York: Springer-Verlag, pp. 167–212, ISBN 0-387-96311-1
• Mumford, David (1975), Curves and their Jacobians, The University of Michigan Press, Ann Arbor, Mich., MR 0419430
• Shokurov, V.V. (2001) [1994], "Jacobi variety", Encyclopedia of Mathematics, EMS Press
• Weil, André (1948), Variétés abéliennes et courbes algébriques, Paris: Hermann, MR 0029522, OCLC 826112
• Hartshorne, Robin, Algebraic Geometry, New York: Springer, ISBN 0-387-90244-9
• Montserrat Teixidor i Bigas On the number of parameters for curves whose Jacobians possess non-trivial endomorphisms.;^[1] Theta Divisors for vector bundles in Curves, Jacobians, and Abelian Varieties^[2]

1. On the number of parameters for curves whose Jacobians possess non-trivial endomorphisms
2. Curves, Jacobians, and Abelian Varieties